Connected-Intersecting Families of Graphs

Abstract

For a graph property P and a common vertex set V = \1, 2, …, n\, a family of graphs on V is P-intersecting iff G H satisfies P for all G,H in the family. Addressing a question of Chung, Graham, Frankl, and Shearer, we explore---for various P---the maximum cardinality among all P-intersecting families of graphs. In the connected-intersecting case, we resolve the question completely by a short linear algebraic proof showing this maximum is attained by taking all graphs containing a fixed spanning tree (though we show other extremal constructions as well). We also present a new lower bound for containing unions of a fixed subgraph.